Hi
Wonder if you could please help me simulate and plot geometric brownian
motion (GBM)
E.g. dS = mew * S dt + sigma * S *dX
What I am trying to do is generate in Mathematica the process for a
stock/share price based on GBM
Therefore:
dS is change in share price
S is the share price (e.g. let S start from 100)
dt is the time step (e.g. in discrete version we could have dt=1/52 so
timestep is 1 week)
mew is the drift (e.g. mew = 5%)
sigma is the volatility (e.g. sigma = 10%)
dX is brownian motion (e.g. in discrete version, dX = Sqrt(dt) * N(0,1))
What I am trying to obtain is pairs (x,y) where x is the time step and y is
the share price. And then to be able to plot this.
Thanks for your help,
Priyan.